Relative bounded cohomology on groups with contracting elements
Abstract
Let be a countable group acting properly on a metric space with contracting elements and be a finite collection of Morse subgroups in . We prove that each has infinite index in if and only if the relative second bounded cohomology is infinite-dimensional. In addition, we also prove that for any contracting element , there exists such that is infinite-dimensional. Our results generalize a theorem of Pagliantini-Rolli for finite-rank free groups and yield new results on the (relative) second bounded cohomology of groups.
Keywords
Cite
@article{arxiv.2409.20348,
title = {Relative bounded cohomology on groups with contracting elements},
author = {Zhenguo Huangfu and Renxing Wan},
journal= {arXiv preprint arXiv:2409.20348},
year = {2026}
}
Comments
29 pages, 8 figures. We have removed Section 7 and the corresponding results. Following the referees' suggestions, we have made many corrections of this paper, including adding some figures, modifying the statements and proofs of some lemmas, and revising a large number of grammatical issues